Randomly Amplified Discrete Langevin Systems
Abstract
A discrete stochastic process involving random amplification with additive noise is studied analytically. If the non-negative random amplification factor b is such that <bβ>=1 where β is any positive non-integer, then the steady state probability density function for the process will have power law tails of the form p(x) 1/xβ +1. This is a generalization of recent results for 0 < β < 2 obtained by Takayasu et al. in Phys. Rev. lett. 79, 966 (1997). It is shown that the power spectrum of the time series x becomes Lorentzian, even when 1 < β < 2, i.e., in case of divergent variance.
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